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On the extended direct sum conjecture

Proceedings of the twenty-first annual ACM symposium on Theory of computing - STOC '89, 1989
We consider the quadratic complexity of certain sets of quadratic forms. We study a classes of direct sums of quadratic forms. For these classes of problems we show that the complexity of one direct sum is the sum of the complexity of the summands and that every minimal quadratic algorithm for computing the direct sums is a direct-sum algorithm.
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DIRECT SUMS OF OPERATOR SPACES

Journal of the London Mathematical Society, 2001
It is proved that if X and Y are operator spaces such that every completely bounded operator from X into Y is completely compact and Z is a completely complemented subspace of X [oplus ] Y, then there exists a completely bounded automorphism τ: X [oplus ] Y → X [oplus ] Y with completely bounded inverse such that τZ = X0 [oplus ] Y0, where ...
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Direct Sums and Direct Products

2015
The concept of direct sum is of utmost importance for the theory. This is mostly due to two facts: first, if we succeed in decomposing a group into a direct sum, then it can be studied by investigating the summands separately, which are, in numerous cases, simpler to deal with.
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Orthogonal Direct Sums

2002
In Theorem 2.6 we obtained, for an inner product space V and a finite-dimensional subspace W of V, a direct sum decomposition of the form V = W ⊕W⊥. We now consider the following general notion.
T. S. Blyth, E. F. Robertson
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Direct Sums and Products

1974
For each ring R we have derived several module categories—among these the category R M of left R-modules. This derivation is not entirely reversible for, in general, R M does not characterize R. However, as we shall see in Chapter 6 it does come close. Thus, we can expect to uncover substantial information about R by mining R M.
Frank W. Anderson, Kent R. Fuller
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Direct Sums of Subspaces

2002
If A and B are non-empty subsets of a vector space V over a field F then the subspace spanned by A ∪ B, i.e. the smallest subspace of V that contains both A and B, is the set of linear combinations of elements of A ∪ B. In other words, it is the set of elements of the form $$ [\sum\limits_{i = 1}^m {{\lambda _i}} {a_i} + \sum\limits_{j = 1}^n {{\mu
T. S. Blyth, E. F. Robertson
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On centres and direct sum decompositions of higher degree forms

Linear and Multilinear Algebra, 2022
Hua-Lin Huang, Huajun Lu, Yu Ye
exaly  

Subrings of Direct Sums

American Journal of Mathematics, 1938
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Direct sums of cyclic summands

Commentarii mathematici Universitatis Sancti Pauli = Rikkyo Daigaku sugaku zasshi, 1983
Doyle, Cutler   +3 more
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